Multiple Linear Regression - Estimated Regression Equation |
Totaal[t] = -5.96218183324188e-11 + 1mannen[t] + 1vrouwen[t] + 2.37214051156172e-16Beroepsinschakeling[t] -3.51251039741478e-16jongerdan25jaar[t] -7.18786765600635e-17meerdan2jaarinactief[t] + 1.4441721467904e-12Dummy[t] + e[t] |
Multiple Linear Regression - Ordinary Least Squares | |||||
Variable | Parameter | S.D. | T-STAT H0: parameter = 0 | 2-tail p-value | 1-tail p-value |
(Intercept) | -5.96218183324188e-11 | 0 | -2.9152 | 0.005166 | 0.002583 |
mannen | 1 | 0 | 36780583929833776 | 0 | 0 |
vrouwen | 1 | 0 | 10074480782859574 | 0 | 0 |
Beroepsinschakeling | 2.37214051156172e-16 | 0 | 1.675 | 0.099714 | 0.049857 |
jongerdan25jaar | -3.51251039741478e-16 | 0 | -1.9584 | 0.055359 | 0.02768 |
meerdan2jaarinactief | -7.18786765600635e-17 | 0 | -0.6466 | 0.520646 | 0.260323 |
Dummy | 1.4441721467904e-12 | 0 | 1.5445 | 0.128318 | 0.064159 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 1 |
R-squared | 1 |
Adjusted R-squared | 1 |
F-TEST (value) | 1.58854724702485e+33 |
F-TEST (DF numerator) | 6 |
F-TEST (DF denominator) | 54 |
p-value | 0 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 2.44862900279602e-12 |
Sum Squared Residuals | 3.23772335640028e-22 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 527070 | 527070 | -4.06620724016702e-12 |
2 | 509846 | 509846 | -6.6780197976585e-12 |
3 | 514258 | 514258 | 4.55740482688934e-12 |
4 | 516922 | 516922 | -1.41184712468518e-12 |
5 | 507561 | 507561 | 2.05120137585559e-12 |
6 | 492622 | 492622 | 3.65927717562163e-12 |
7 | 490243 | 490243 | 3.31208577623015e-12 |
8 | 469357 | 469357 | -2.16789287337143e-12 |
9 | 477580 | 477580 | 5.24078500070138e-12 |
10 | 528379 | 528379 | -3.71185345294824e-12 |
11 | 533590 | 533590 | -1.81861523858635e-12 |
12 | 517945 | 517945 | -4.07321948708827e-12 |
13 | 506174 | 506174 | 4.30093971500771e-12 |
14 | 501866 | 501866 | 3.94894365559109e-12 |
15 | 516141 | 516141 | -1.86926502522859e-12 |
16 | 528222 | 528222 | -3.43874295221013e-13 |
17 | 532638 | 532638 | -5.26496865395181e-13 |
18 | 536322 | 536322 | -1.83670708087776e-12 |
19 | 536535 | 536535 | 4.31702393815766e-13 |
20 | 523597 | 523597 | -3.36165120402725e-13 |
21 | 536214 | 536214 | -5.80275897553204e-14 |
22 | 586570 | 586570 | 2.04632424075041e-12 |
23 | 596594 | 596594 | 2.08770071828115e-13 |
24 | 580523 | 580523 | 2.1478437156996e-12 |
25 | 564478 | 564478 | -1.45935474712105e-12 |
26 | 557560 | 557560 | 2.73480146596233e-13 |
27 | 575093 | 575093 | -2.80385745290747e-12 |
28 | 580112 | 580112 | 2.47621852034358e-12 |
29 | 574761 | 574761 | -5.90018513093159e-13 |
30 | 563250 | 563250 | -2.78025076231123e-12 |
31 | 551531 | 551531 | -2.19973232826627e-12 |
32 | 537034 | 537034 | -1.55229619038815e-14 |
33 | 544686 | 544686 | -6.02871301518195e-13 |
34 | 600991 | 600991 | 1.89249251404661e-12 |
35 | 604378 | 604378 | -3.08085068591331e-13 |
36 | 586111 | 586111 | 2.63763529048869e-12 |
37 | 563668 | 563668 | -1.61542889659434e-12 |
38 | 548604 | 548604 | -3.10571955801575e-12 |
39 | 551174 | 551174 | -9.92893848693827e-13 |
40 | 555654 | 555654 | 2.31788182275989e-13 |
41 | 547970 | 547970 | 1.35237024001785e-13 |
42 | 540324 | 540324 | -6.63304660461778e-13 |
43 | 530577 | 530577 | 7.84865426484847e-14 |
44 | 520579 | 520579 | -6.36554755297193e-13 |
45 | 518654 | 518654 | 1.00598940694257e-12 |
46 | 572273 | 572273 | -7.4809778711006e-13 |
47 | 581302 | 581302 | 1.69835673918651e-12 |
48 | 563280 | 563280 | -1.21227470261981e-12 |
49 | 547612 | 547612 | -8.8975751531962e-14 |
50 | 538712 | 538712 | 6.55673837522602e-13 |
51 | 540735 | 540735 | -8.7074634915496e-13 |
52 | 561649 | 561649 | -1.12042306734504e-12 |
53 | 558685 | 558685 | -1.35418961349683e-12 |
54 | 545732 | 545732 | 3.21998419190559e-12 |
55 | 536352 | 536352 | 1.07085857806558e-12 |
56 | 527676 | 527676 | -9.60261911964122e-13 |
57 | 530455 | 530455 | -9.88884363472066e-13 |
58 | 581744 | 581744 | 1.06897840901421e-12 |
59 | 598714 | 598714 | 1.49990617563549e-12 |
60 | 583775 | 583775 | 3.66346056509951e-12 |
61 | 571477 | 571477 | 5.01815521091692e-13 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
10 | 0.401975781621498 | 0.803951563242995 | 0.598024218378502 |
11 | 3.30990893156055e-06 | 6.61981786312111e-06 | 0.999996690091068 |
12 | 1 | 1.3445945172853e-26 | 6.72297258642651e-27 |
13 | 0.540459034491497 | 0.919081931017007 | 0.459540965508503 |
14 | 1 | 2.50113424321526e-28 | 1.25056712160763e-28 |
15 | 0.37636356920046 | 0.75272713840092 | 0.62363643079954 |
16 | 0.528940974411075 | 0.94211805117785 | 0.471059025588925 |
17 | 1 | 1.13942182391014e-45 | 5.69710911955069e-46 |
18 | 1 | 4.56280419432322e-38 | 2.28140209716161e-38 |
19 | 0.101776193437576 | 0.203552386875153 | 0.898223806562424 |
20 | 1 | 5.78955842825587e-45 | 2.89477921412793e-45 |
21 | 0.938300859344592 | 0.123398281310817 | 0.0616991406554083 |
22 | 0.871083989152873 | 0.257832021694254 | 0.128916010847127 |
23 | 0.857586555233218 | 0.284826889533564 | 0.142413444766782 |
24 | 1 | 7.1544694490018e-32 | 3.5772347245009e-32 |
25 | 1 | 1.33181080983562e-26 | 6.65905404917811e-27 |
26 | 0.947646689996302 | 0.104706620007397 | 0.0523533100036985 |
27 | 1 | 1.53539336598527e-30 | 7.67696682992634e-31 |
28 | 1 | 8.66418116939632e-33 | 4.33209058469816e-33 |
29 | 1 | 9.19358255174543e-30 | 4.59679127587272e-30 |
30 | 0.998551507734179 | 0.00289698453164245 | 0.00144849226582123 |
31 | 1.90637238030207e-23 | 3.81274476060413e-23 | 1 |
32 | 1 | 1.0151001076545e-17 | 5.0755005382725e-18 |
33 | 2.84133165962269e-23 | 5.68266331924537e-23 | 1 |
34 | 0.695811884825134 | 0.608376230349732 | 0.304188115174866 |
35 | 0.10790344295353 | 0.215806885907061 | 0.89209655704647 |
36 | 2.09804757304508e-26 | 4.19609514609016e-26 | 1 |
37 | 0.298069215742123 | 0.596138431484245 | 0.701930784257877 |
38 | 1 | 4.01550430211034e-22 | 2.00775215105517e-22 |
39 | 1.32608378886894e-27 | 2.65216757773789e-27 | 1 |
40 | 0.804634085874488 | 0.390731828251023 | 0.195365914125512 |
41 | 0.999999999999976 | 4.88743971459987e-14 | 2.44371985729993e-14 |
42 | 0.999999999999961 | 7.75375353602934e-14 | 3.87687676801467e-14 |
43 | 0.00480097059834654 | 0.00960194119669308 | 0.995199029401654 |
44 | 3.58067074707112e-35 | 7.16134149414224e-35 | 1 |
45 | 0.999999999958598 | 8.28037766388869e-11 | 4.14018883194435e-11 |
46 | 0.227568214154999 | 0.455136428309999 | 0.772431785845001 |
47 | 0.291034629518155 | 0.582069259036311 | 0.708965370481845 |
48 | 8.55110864957375e-29 | 1.71022172991475e-28 | 1 |
49 | 2.84674289247067e-16 | 5.69348578494133e-16 | 1 |
50 | 0.814895007124491 | 0.370209985751018 | 0.185104992875509 |
51 | 0.931659105316868 | 0.136681789366264 | 0.068340894683132 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 25 | 0.595238095238095 | NOK |
5% type I error level | 25 | 0.595238095238095 | NOK |
10% type I error level | 25 | 0.595238095238095 | NOK |